(A few days ago "fact" went to "information"; the article starts "The word fact can refer to verified information" and someone made "verified" into a link recently. In that case the sequence is fact, information, sequence, mathematics.)

("rationality" used to go to "philosophy", until someone edited it, leaving the note "Raised the period of the Philosophy article... it was ridiculously low." Of course once someone points out some property of Wikipedia, people will tamper with it.

This doesn't seem to happen if you click on random links, or even second links. The basic reason seems to be a quirk of Wikipedia style -- the article for X often starts out "X is a Y" or "In the field of Y, X is..." or something like that, so there's a tendency for the first link in an article to point to something "more general". Does this mean that "mathematics" necessarily has to be the attractor? Of course not. But it does mean that the attractor, if it exists, will probably be some very broad article.

Edited to add, Thursday, 10:26 am: Try the same thing at the French wikipedia; it doesn't work. This seems to depend on certain conventions that English-language Wikipedians have adopted. However, it seems to work at the Spanish wikipedia, with Filosofía as the target.

6 comments:

You usually get to mathematics (90% or so) that then goes to philosophy. Occassionaly you do bypass mathematics. Amusingly a counter-example to always arriving at mathematics is the article tittled "counterexample"

I think that since this has started to get attention people have been making changes so that it's not true, or so that it's not quite so obvious. Ideally one would want to explore Wikipedia as it existed a week ago, instead of Wikipedia today.

By graph theory, every path must end in a cycle or a dead end (are there dead ends)? Right now mathematics and philosophy are in the same cycle. I wonder if this cycle has the largest basin of attraction of any cycle/dead end---that seems to be the case. I wonder what percent of the vertices are in it (at any given point in time).